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Chapter 14: Problem 41

In three different experiments, the following results were obtained for the reaction \(A \longrightarrow\) products: \([\mathrm{A}]_{0}=1.00 \mathrm{M}, t_{1 / 2}=50 \mathrm{min} ;[\mathrm{A}]_{0}=200 \mathrm{M}, t_{1 / 2}=\) \(25 \min ;[\mathrm{A}]_{0}=0.50 \mathrm{M}, t_{1 / 2}=100 \mathrm{min} .\) Write the rate equation for this reaction, and indicate the value of \(k.\)

Short Answer

Expert verified
The rate equation for this reaction is \(rate = k [A]\), and the rate constant (\(k\)) is \(0.0139 min^{-1}\).

Step by step solution

01

Determine the Order of Reaction

The half-life of a first-order reaction is constant and it's independent of the initial concentration of the reactant. In our case, when the concentration of reactant \(A\) is doubled, the half-life halves, indicating a first-order reaction.
02

Write the Rate Equation

With the first-order reaction identified, the rate equation can be written as: \(rate = k [A]^{1}\). The exponent '1' indicates that the reaction is indeed first-order.
03

Calculate rate constant (\(k\))

The half-life of a first-order reaction is related to the rate constant through the formula: \(t_{1/2} = 0.693/k\). Rearranging for \(k\), gives: \(k = 0.693 / t_{1/2}\). Plugging in the value from one of the experiments (for example: \(t_{1 / 2}=50 \mathrm{min}\)): \(k = 0.693 / 50 min = 0.0139 min^{-1}\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Reaction Order
When talking about reaction kinetics, understanding the **reaction order** is essential. It tells us how the concentration of a reactant influences the rate of a reaction. In simple terms, the reaction order shows whether the concentration of the reactants has a direct effect, or not, on how fast the reaction proceeds. In the case of a **first-order reaction**, the rate of reaction is directly proportional to the concentration of one reactant. This means that if you double the concentration of that reactant, the rate of reaction doubles as well. The experiments provided in the exercise point to a first-order reaction, as changes in concentration resulted in changes in the half-life that reflect such proportionality. Envision a scenario: If the concentration of reactant \( A \) is changed, and you observe that the half-life halves or stays consistent, it often signifies a first-order dependency. This characteristic remains constant, irrespective of the initial concentration, which simplifies analysis and helps predict reaction outcomes efficiently.
Rate Equation
Once the reaction order is determined, formulating the **rate equation** becomes straightforward. A rate equation expresses the reaction rate in terms of the concentration of reactants and the rate constant \( k \). For a first-order reaction, such as the one you've identified in this exercise, the rate equation is written as:
  • \( ext{Rate} = k [A]^1 \)
Here, \( [A]^1 \) represents the concentration of reactant \( A \) raised to the power of 1, indicating a first-order relationship.This equation is concise yet powerful, allowing predictions on how the reaction progresses over time. By using the rate equation, you can understand how at any given time, changes in reactant concentration impact the reaction speed. This is crucial for controlling reaction conditions in laboratory and industrial settings, ensuring that reactions proceed at desired rates.
Rate Constant
The **rate constant** \( k \) is a crucial parameter in any rate equation, acting as a proportionality factor that links the reaction rate with the concentration of reactants. Its value reflects how fast the reaction can proceed under certain conditions.To calculate \( k \) for a first-order reaction, you use the half-life formula:
  • \( t_{1/2} = \frac{0.693}{k} \)
By rearranging this formula to solve for \( k \), you find:
  • \( k = \frac{0.693}{t_{1/2}} \)
Inserting the given half-life from our exercise — for example, \( 50 \) minutes — results in:
  • \( k = \frac{0.693}{50 \, \text{min}} = 0.0139 \, \text{min}^{-1} \)
The rate constant is unique to each reaction and depends on factors like temperature and presence of catalysis. Understanding \( k \) allows chemists to make accurate predictions about how a reaction behaves under various conditions, enabling precise control over chemical processes.

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Most popular questions from this chapter

For the reaction \(\mathrm{A}+\mathrm{B} \longrightarrow 2 \mathrm{C},\) which proceeds by a single-step bimolecular elementary process, (a) \(t_{1 / 2}=0.693 / k ;\) (b) rate of appearance of C= - rate of disappearance of \(\mathrm{A} ;\) (c) rate of reaction = \(k[\mathrm{A}][\mathrm{B}] ;\) (d) \(\ln [A]_{t}=-k t+\ln [A]_{0}.\)

For the reaction \(A \longrightarrow\) products, the data tabulated below are obtained. (a) Determine the initial rate of reaction (that is, \(-\Delta[\mathrm{A}] / \Delta t)\) in each of the two experiments. (b) Determine the order of the reaction. $$\begin{array}{ll} \hline \text { First Experiment } & \\ \hline[\mathrm{A}]=1.512 \mathrm{M} & t=0 \mathrm{min} \\ \begin{array}{l} | \mathrm{A}\rfloor=1.490 \mathrm{M} \\ {[\mathrm{A}]=1.469 \mathrm{M}} \end{array} & \begin{array}{l} t=1.0 \mathrm{min} \\ t=2.0 \mathrm{min} \end{array} \\ \hline & \\ \hline \text { Second Experiment } & \\ \hline[\mathrm{A}]=3.024 \mathrm{M} & t=0 \mathrm{min} \\ {[\mathrm{A}]=2.935 \mathrm{M}} & t=1.0 \mathrm{min} \\ {[\mathrm{A}]=2.852 \mathrm{M}} & t=2.0 \mathrm{min} \\ \hline \end{array}$$

A reaction is \(50 \%\) complete in 30.0 min. How long after its start will the reaction be \(75 \%\) complete if it is (a) first order; (b) zero order?

The half-life for the first-order decomposition of nitramide, \(\mathrm{NH}_{2} \mathrm{NO}_{2}(\mathrm{aq}) \longrightarrow \mathrm{N}_{2} \mathrm{O}(\mathrm{g})+\mathrm{H}_{2} \mathrm{O}(1),\) is \(123 \min\) at \(15^{\circ} \mathrm{C} .\) If \(165 \mathrm{mL}\) of a \(0.105 \mathrm{M} \mathrm{NH}_{2} \mathrm{NO}_{2}\) solution is allowed to decompose, how long must the reaction proceed to yield \(50.0 \mathrm{mL}\) of \(\mathrm{N}_{2} \mathrm{O}(\mathrm{g})\) collected over water at \(15^{\circ} \mathrm{C}\) and a barometric pressure of \(756 \mathrm{mm} \mathrm{Hg} ?\) (The vapor pressure of water at \(15^{\circ} \mathrm{C}\) is \(12.8 \mathrm{mmHg} .)\)

If the plot of the reactant concentration versus time is linear, then the order of the reaction is (a) zero order; (b) first order; (c) second order; (d) third order.
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